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How a projectively flat geometry regulates <i>F(R)</i> -gravity theory?

Tee‐How Loo, Avik De, Sanjay Mandal, P. K. Sahoo

2021Physica Scripta25 citationsDOIOpen Access PDF

Abstract

Abstract In the present paper we examine a projectively flat spacetime solution of F ( R )-gravity theory. It is seen that once we deploy projective flatness in the geometry of the spacetime, the matter field has constant energy density and isotropic pressure. We then make the condition weaker and discuss the effects of projectively harmonic spacetime geometry in F ( R )-gravity theory and show that the spacetime in this case reduces to a generalised Robertson-Walker spacetime with a shear, vorticity, acceleration free perfect fluid with a specific form of expansion scalar presented in terms of the scale factor. Role of conharmonic curvature tensor in the spacetime geometry is also briefly discussed. Some analysis of the obtained results are conducted in terms of couple of F ( R )-gravity models.

Topics & Concepts

SpacetimePhysicsCurvatureFlatness (cosmology)Quantum field theory in curved spacetimeClassical mechanicsMathematical physicsStationary spacetimeGeometryQuantum gravityMathematicsCosmologyQuantum mechanicsQuantumCosmology and Gravitation TheoriesBlack Holes and Theoretical PhysicsAdvanced Differential Geometry Research
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